“The geometrical results listed in the following pages(18-19) should first be encountered by learners through investigation and discovery.” (Syllabus)

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Presentation on theme: "“The geometrical results listed in the following pages(18-19) should first be encountered by learners through investigation and discovery.” (Syllabus)"— Presentation transcript:

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“The geometrical results listed in the following pages(18-19) should first be encountered by learners through investigation and discovery.” (Syllabus) Strand 2: Synthetic Geometry Geostrips & Student CD “Theorems are full of potential for surprise and delight. Every theorem can be taught by considering the unexpected matter which theorems claim to be true. Rather than simply telling students what the theorem claims, it would be helpful if we assumed we didn’t know it...it is the mathematics teacher’s responsibility to recover the surprise embedded in the theorem and convey it to the pupils. The method is simple: just imagine you do not know the fact. This is where the teacher meets the students.”

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Convince themselves through investigation that theorems 1 – 6 are true 1.Vertically opposite angles are equal in measure. 2.In an isosceles triangle the angles opposite the equal sides are equal (and converse). 3.If a transversal makes equal alternate angles on two lines then the lines are parallel (and converse). 4.The angles in any triangle add to 180 o. 5.Two lines are parallel if and only if, for any transversal, the corresponding angles are equal. 6.Each exterior angle of a triangle is equal to the sum of the interior opposite angles. 2.1 Synthetic Geometry-C.I.C Proof Required JC (H/L)

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If a transversal makes equal alternate angles on two lines then the lines are parallel. Conversely, if two lines are parallel, then any transversal will make equal alternate angles with them. (C.I.C)

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*The angles in any triangle add to 180° (C.I.C) * Proof H/L JC Note: Could use the same triangles to investigate the following Theorem. The angle opposite the greater of two sides is greater than the angles opposite the lesser. Conversely, the side opposite the greater of two angles is greater than the side opposite the lesser angle. (LC O/L & H/L)

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Two lines are parallel, if and only if, for any transversal, corresponding angles are equal. (C.I.C)

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* Each exterior angle of a triangle is equal to the sum of the interior opposite angles. (C.I.C) * Proof H/L JC

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Theorem 8-WS2-LC (O/L&H/L) What is the title of this theorem?

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Theorem Title Two Sides of a Triangle are Together Greater than the Third

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* In a parallelogram, opposite sides are equal, and opposite angles are equal. Conversely (1) If the opposite angles of a convex quadrilateral are equal, then it is a parallelogram; (2) If the opposite sides of a convex quadrilateral are equal, then it is a parallelogram. (All Levels) * Proof H/L JC

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The diagonals of a parallelogram bisect each other. Conversely, if the diagonals of a quadrilateral bisect one another, then the quadrilateral is a parallelogram. (All Levels)

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If three parallel lines cut off equal segments on some transversal line, then they will cut off equal segments on any other transversal (JC H/L + LC O/L & H/L). * Proof Required LC H/L

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* In a parallelogram, opposite sides are equal, and opposite angles are equal. Conversely (1) If the opposite angles of a convex quadrilateral are equal, then it is a parallelogram; (2) If the opposite sides of a convex quadrilateral are equal, then it is a parallelogram. (All Levels) * Proof H/L JC Theorem 18 The area of a parallelogram is the base x height. LC (O/L & H/L).

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Theorem 13 If two triangles are similar, then their sides are proportional, in order.

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For a triangle, base times height does not depend on the choice of base. LC (O/L & H/L)

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Exam Question 2011 Sample Paper JC H/L Q8 Paper 2 Pg 13

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Circular Geoboards-Circle Theorems Examples Theorems Corollaries & Theorem 21. The angle at the centre of the circle standing on a given arc is twice the angle at any point of the circle standing on the same arc. (H/L JC + H/L LC) * Proof Required JC H/L

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All angles at points of a circle, standing on the same arc are equal (and converse). (H/L JC + H/L LC)